Gerling's dissection

One way to improve learning of stereometry is to give 3D illustrations to existing standard texts and
make paper models. Here we shall give an example from [1]. We use Live 3D applet [2].
In a letter to Gauss Christian Ludwig Gerling (1844) described a simple 12-piece dissection of an
irregular tetrahedron to its mirror image using a circumscribed sphere. Juel (1903) gave a related
dissection that uses the inscribed sphere. Borge Jessen (1968) combined pairs of pieces in Juel's
dissection to give a 6-piece dissection. [1, pgs. 230-232]. It is a three-dimensional analoqueof the
dissection of a triangle to its mirror image [1, pg. 24].

Note that pieces are moved in the plane of the triangle (the third and the fourth figure) and not
through rotation in space as is indicated by the second figure.

First, inscribe the sphere in the tetrahedron. The point of tangency with the face opposite vertex A
is A1, with B1, C1, and D1 similarly named. Next cut the tetrahedron into six pieces [1, pg. 232].

The upper figure shows the piece that belongs to edge AB. The other vertices being the points of
tangency C1 and D1 and the center of the inscribed sphere. Here are two more pieces and the final
construction:

Use the following nets to make models. Note that nets are symmetrical (Aleksandrov theorem:
a symmetrical polyhedron has a symmetrical net ).